What is the slope of the line normal to the tangent line of $f(x) = secx+sin(2x-(3pi)/8)$ at $x= (11pi)/8$ ?

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Answer 1 · 2018-06-09T11:28:02

The slope of the normal line is given by $1/(3sqrt(2+sqrt(2)))$

The derivative is given by

$f'(x)=2sin(pi/8+2x)+sec(x)*tan(x)$

for $x=11/8pi$ we get

$f'(pi/8)=sqrt(2-sqrt(2))-2sqrt(2+sqrt(2))/(2-sqrt(2))$
simplified to

$f'(pi/8)=-3sqrt(2+sqrt(2))$

so the slope of the normal line is given by

$f'(pi/8)=1/(3sqrt(2+sqrt(2)))$

What is the slope of the line normal to the tangent line of f(x) = secx+sin(2x-(3pi)/8) f(x) = secx+sin(2x-(3pi)/8) at x= (11pi)/8 x= (11pi)/8 ?